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If ∆ ABC ≅ ∆ PQR and ∆ ABC is not congruent to ∆ RPQ, then which of the following is not true:

AB = PQQR = BCAC = PRBC = PQ

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Which of the following is not a criterion for congruence of triangles?

SSSSSAASASAS

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If AB = QR, BC = PR and CA = PQ, then

∆ PQR ≅ ∆ BCA∆ BAC ≅ ∆ RPQ∆ CBA ≅ ∆ PRQ∆ ABC ≅ ∆ PQR

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In ∆ ABC, AB = AC and ∠B = 50°. Then ∠C is equal to

130°80°50°40°

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In ∆ ABC, BC = AB and ∠B = 80°. Then ∠A is equal to

100°50°40°80°

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In ∆ PQR, ∠R = ∠P and QR = 4 cm and PR = 5 cm. Then the length of PQ is

2.5 cm2 cm5 cm4 cm

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D is a point on the side BC of a ∆ ABC such that AD bisects ∠BAC. Then

CD > CABD > BABA > BDBD = CD

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It is given that ∆ ABC ≅ ∆ FDE and AB = 5 cm, ∠B = 40° and ∠A = 80°. Then which of the following is true?

DE = 5 cm, ∠D = 40°DE = 5 cm, ∠E = 60°DF = 5 cm, ∠E = 60°DF = 5 cm, ∠F = 60°

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Two sides of a triangle are of lengths 5 cm and 1.5 cm. The length of the third side of the triangle cannot be

3.4 cm3.8 cm4.1 cm3.6 cm

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In ∆ PQR, if ∠R > ∠Q, then

QR < PRPQ < PRPQ > PRQR > PR

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In triangles ABC and PQR, AB = AC, ∠C = ∠P and ∠B = ∠Q. The two triangles are

neither congruent nor isoscelescongruent but not isoscelesisosceles and congruentisosceles but not congruent